On Perelman's W-entropy and Shannon entropy power for super Ricci flows on metric measure spaces

Abstract

In this paper, we extend Perelman's W-entropy formula and the concavity of the Shannon entropy power from smooth Ricci flow to super Ricci flows on metric measure spaces. Moreover, we prove the Li-Yau-Hamilton-Perelman Harnack inequality on super Ricci flows. As a significant application, we prove the equivalence between the volume non-local collapsing property and the lower boundedness of the W-entropy on RCD(0, N) spaces. Finally, we use the W-entropy to study the logarithmic Sobolev inequality with optimal constant on super Ricci flows on metric measure spaces.